Metaplectic Iwahori Whittaker functions and supersymmetric lattice models

Abstract

In this paper we compute new values of Iwahori Whittaker functions on n-fold metaplectic covers G of G(F) with G a split reductive group over a non-archimedean local field F. For every Iwahori Whittaker function φ, and for every g∈G, we evaluate φ(g) by recurrence relations over the Weyl group using novel "vector Demazure-Whittaker operators." The general formula and strategy of proof are inspired by ideas appearing in the theory of integrable systems. Specializing to the case of G = GLr, we construct a solvable lattice model of a new type associated with the quantum affine super group Uq(gl(r|n)) and prove that its partition function equals φ(g). To prove this equality we match the recurrence relations on the lattice model side (obtained from the Yang-Baxter equation) to the recurrence relations for φ(g) derived by using the representation theory of G. Remarkably, there is a bijection between the boundary data specifying the partition function and the data determining all values of the Whittaker functions.